Method and Apparatus for Multi-Table Based Context Adaptive Binary Arithmetic Coding

ABSTRACT

A method and apparatus of entropy coding for a video encoder or decoder using multiple-table based Context-Based Adaptive Binary Arithmetic Coder (CABAC) are disclosed. In one embodiment, a current bin of a binary data of a current coding symbol is encoded or decoded according to a probability of a binary value of the current bin and the probability of the binary value is updated according to the binary value of the current bin for a next bin by using multiple-parameter probability models. Each multiple-parameter probability model is updated using at least one lookup table with the individual set of probability state as a table index to access contents of said at least one lookup table. In another embodiment, the range update is calculated for a range interval based on middle value of the range interval.

CROSS REFERENCE TO RELATED APPLICATIONS

The present invention claims priority to U.S. Provisional Patent Application, Ser. No. 62/163,473, filed on May 19, 2015, U.S. Provisional Patent Application, Ser. No. 62/214,129, filed on Sep. 3, 2015 and U.S. Provisional Patent Application, Ser. No. 62/322,306, filed on Apr. 14, 2016. The U.S. Provisional Patent Applications are hereby incorporated by reference in their entireties.

FIELD OF THE INVENTION

The present invention relates to entropy coding techniques for image coding and video coding. In particular, the present invention relates to multi-table based Context-Based Adaptive Binary Arithmetic Coder (CABAC) for image coding and video coding.

BACKGROUND AND RELATED PRIOR ART

The arithmetic coding is known as one of the efficient data compressing methods, and is widely used in coding standards, including JBIG, JPEG2000, H.264/AVC, and High-Efficiency Video Coding (HEVC). In H.264/AVC and HEVC Test Model Version 16.0 (HM-16.0), context-based adaptive binary arithmetic coding (CABAC) is adopted as the entropy coding tool in the video coding system.

As shown in FIG. 1, CABAC consists of three parts: binarization unit 110, context modelling unit 120, and binary arithmetic coding unit 130. In the binarization step, each syntax element is uniquely mapped into a binary string (bin or bins). In the context modelling step, a probability model is selected for each bin. The corresponding probability model may depend on previously encoded syntax elements, bin indexes, and side information. After the binarization and the context model assignment, a bin value along with its associated model is transmitted to the binary arithmetic coding engine.

Binary arithmetic coding is a recursive interval-subdividing procedure. The output bitstream is the pointer to the final probability of coding interval. The probability of coding interval, T is specified by range and the lower bound of coding interval (designated as “low” in the following discussion). The range is the possible scope of the coding interval. Depending on whether the current symbol is the most probable symbol (MPS) or the least probable symbol (LPS), the next coding interval is updated as one of the two sub-intervals accordingly, as shown in eq. (1) and eq. (2).

$\begin{matrix} {{range}_{n + 1} = \left\{ \begin{matrix} {{{range}_{n} - {rangeLPS}_{n}},} & {{if}\mspace{14mu} {MPS}} \\ {{rangeLPS}_{n},} & {{if}\mspace{14mu} {LPS}} \end{matrix} \right.} & (1) \\ {{low}_{n + 1} = \left\{ {\begin{matrix} {{low}_{n},} & {{if}\mspace{14mu} {MPS}} \\ {{{low}_{n} + {range}_{n} - {rangeLPS}_{n}},} & {{if}\mspace{14mu} {LPS}} \end{matrix},} \right.} & (2) \end{matrix}$

where rangeLPS is the estimated range when LPS is coded.

FIG. 2 illustrates the concept of the binary arithmetic coding. Initially, the probability range (i.e., range₀) is 1 and the low boundary (i.e., low₀) is 0 as indicated by probability scale 210. If the first symbol is a MPS symbol, a pointer in the lower part of the probability scale 210 may be used to signal the event of an MPS symbol. The range₁ is used as the probability scale 220 for processing the next symbol. Again, the probability scale 220 is divided into two parts for MPS and LPS respectively. If the second symbol is an LPS symbol, the rangeLPS₁ is selected as the probability scale 230 for the next symbol. Every time when a new symbol is coded, the corresponding range becomes smaller. When a range becomes too small, the range can be re-normalized to form a probability scale 240 with larger range.

In modern arithmetic coding, the probability update is often done according to a model. For example, a method is described by Marpe, et al., in a technical publication (“Context-Based Adaptive Binary Arithmetic Coding in the H.264/AVC Video Compression Standard”, IEEE Transactions on Circuits and Systems for Video Technology, Vol. 13, No. 7, pp. 620-636, July 2003), where the following formula is used:

p _(new)=(1−α)·y+α·p _(old).   (3)

In the above equation, y is equal to 0 if current symbol is a most probable symbol (MPS); otherwise, y is equal to 1. This formula provides an estimated value for probability of the least probable symbol (LPS). The weighting α is derived according to the following equation:

α=(min_prob/0.5)^((1/state) ^(_) ^(number)),   (4)

where min_prob corresponds to the minimum probability of the least probable symbol of CABAC and state_number corresponds to the number of context states for probability value estimation.

For CABAC of HEVC, there are 64 probability states. The min_prob is 0.01875, and the state_number is 63. Each state has a probability value indicating the probability to select the LPS. The 64 representative probability values, P_(σ)∈[0.01875,0.5], were derived for the LPS by the following recursive equation:

P _(σ) =α·P _(σ−1) for all σ=1, . . . , 63,

with α=(0.01875/0.5)^(1/63) and p ₀=0.5   (5)

The rangeLPS value of a state σ is derived by the following equation:

rangeLPSσ=RANGE×P _(σ)  (6)

To reduce the computations required for deriving rangeLPS, the result of rangeLPS of each range value can be pre-calculated and stored in a lookup table (LUT). In H.264/AVC and HEVC, a 4-column pre-calculated rangeLPS table is adopted to reduce the table size as shown in Table 1. The range is divided into four segments. In each segment, the rangeLPS of each probability state σ (p_(σ)) is pre-defined. In other words, the rangeLPS of a probability state σ is quantized into four values. The rangeLPS selected depends on the segment that the range belongs to.

TABLE 1 (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 510 State Range LPS 0 128 176 208 240 1 128 167 197 227 2 128 158 187 216 3 123 150 178 205 4 116 142 169 195 5 111 135 160 185 6 105 128 152 175 7 100 122 144 166 8 95 116 137 158 9 90 110 130 150 10 85 104 123 142 11 81 99 117 135 12 77 94 111 128 13 73 89 105 122 14 69 85 100 116 15 66 80 95 110 16 62 76 90 104 17 59 72 86 99 18 56 69 81 94 19 53 65 77 89 20 51 62 73 85 21 48 59 69 80 22 46 56 66 76 23 43 53 63 72 24 41 50 59 69 25 39 48 56 65 26 37 45 54 62 27 35 43 51 59 28 33 41 48 56 29 32 39 46 53 30 30 37 43 50 31 29 35 41 48 32 27 33 39 45 33 26 31 37 43 34 24 30 35 41 35 23 28 33 39 36 22 27 32 37 37 21 26 30 35 38 20 24 29 33 39 19 23 27 31 40 18 22 26 30 41 17 21 25 28 42 16 20 23 27 43 15 19 22 25 44 14 18 21 24 45 14 17 20 23 46 13 16 19 22 47 12 15 18 21 48 12 14 17 20 49 11 14 16 19 50 11 13 15 18 51 10 12 15 17 52 10 12 14 16 53 9 11 13 15 54 9 11 12 14 55 8 10 12 14 56 8 9 11 13 57 7 9 11 12 58 7 9 10 12 59 7 8 10 11 60 6 8 9 11 61 6 7 9 10 62 6 7 8 9 63 2 2 2 2

In JCTVC-F254 (Alshin et al., Multi parameter probability up-date for CABAC, Joint Collaborative Team on Video Coding (JCT-VC) of ITU-T SG16 WP3 and ISO/IEC JTC1/SC29/WG11, 6th Meeting: Torino, IT, 14-22 July, 2011, Document: JCTVC-F254), Alshin, et al., disclose a multi-parameter probability update for the CABAC of the HEVC standard. The parameter N=1/(1−α) is an approximate measurement for number of previously encoded bins (i.e., “window size”) that have significant influence on the current bin. The choice of parameter N determines sensitivity of the model. A sensitive system will react to real changing quickly. On the other hand, a less sensitive model will not react to noise and random errors. Both properties are useful but contradictory. Accordingly, Alshin, et al., disclose a method to calculate several values with different α_(i) simultaneously:

P _(i) _(_) _(new)=(1-α_(i))·y+α _(i) P _(i) _(_) _(old)   (⁷)

and use weighted average as next bin probability prediction:

P _(i) _(_) _(new)=Σ(β_(i) ·P _(i) _(_) _(new)),   (8)

where β_(i) is a weighting factor associated with α_(i).

Instead of state transition lookup tables (m_aucNextStateMPS and m_aucNextStateLPS) utilized in CABAC of the AVC standard for updating the state and its corresponding probability, Alshin, et al., use the explicit calculation with multiplication free formula for probability update. Assuming that probability p_(i) is represented by integer number P_(i) from 0 to 2^(k) (i.e., p_(i)=P_(i)/2^(k)) and α_(i) is represented by 1 over a power of two number (i.e., α_(i)=1/2^(M) ^(i) ), multiplication free formula for probability update can be derived as follows:

P _(i)=(Y>>M _(i))+P−(P _(i) >>M _(i))   (9)

This formula predicts probability that next bin will be “1”, where Y=2^(k) if the last coding bin is “1”, Y=0 if the last coding bin is “0”, and “>>M_(i)” corresponds to the right shift by M_(i) bits operation.

To keep balance between complexity increase and performance improvement, it is considered that linear combination for probability estimation consists of only two parameters:

P ₀=(Y>>4)+P₀−(P ₀>>4),   (10)

P ₁=(Y>>7)+P₁−(P ₀>>7), and   (11)

P=(P ₀ +P ₁+1)>>1.   (12)

Floating point value that corresponds to probability for AVC CABAC is always less than or equal to 1/2. If the probability exceeds this limit, LPS becomes MPS to keep probability inside interval mentioned above. It needs MPS/LPS switching when the probability of MPS/LPS is larger than 0.5. Alshin, et al., proposed to increase permissible level of probability (in terms of float-point values) up to 1 to avoid MPS/LPS switching. Therefore, one lookup table (LUT) for storing RangeOne or RangeZero is derived.

In VCEG-AZO7 (Chen, et al., “Further improvements to HMKTA-1.0”, ITU-T Video Coding Experts Group (VCEG) meeting, Warsaw, Poland, IT, 19-26 June 2015, Document: VCEG-AZ07), Chen, et al., proposed to use a single parameter CABAC. The probability derivation is the same as JCTVC-F254, which uses eq. (9) to derive the probability of being one or zero. For each context, only one updating speed is used, which means for each context, only one N is used. However, different contexts can use different N's. The range for N is from 4 to 7, and a 2-bit variable is used to indicate the probability updating speed for a specific context model. The N value is determined at the encoder side and signalled in the bitstream.

In JCTVC-F254 and VCEG-AZ07, the LUT of RangeOne or RangeZero is a 64-column by 512-row table. The input of the LUT is current range and the current probability. The valid range of the current range is from 256 to 510. The current range is divided into 64 sections, where each section contains 4 values of current range (e.g. 256 to 259, 260 to 263, etc.). The section index of range can be derived by:

rangeIdx=(range>>2)−64, or   (13)

rangeIdx=(range>>2) & 63   (14)

The valid range of the current probability (P) is from 0 to 2^(k)−1. In JCTVC-F254 and VCEG-AZ07, the k is 15. The current probability is divided into 512 sections, where each section contains 64 values of current probability (e.g. 0 to 63, 64 to 127, etc.). The section index of probability can be derived by

probIdx=(P>>6).   (15)

The RangeOne value can be derived by table lookup, for example

RangeOne=tableRangeOne[rangeIdx][probIdx]  (16)

Each value in tableRangeOne is derived by

EntryValue=Round(clip3 (3, MinRange−3, MinRange*(probIdx+0.5)/M)),   (17)

where MinRange is the lowest range value of the derived rangeIdx. The clip3(X, Y, Z) is to clip the Z value within the range of X to Y. The Round is to round the value to an integer.

For example, the range section for rangeIdx=0 is 256 to 259, the MinRange is 256. The MinRange can be derived by

MinRange=256+(rangeIdx<<2)   (18)

The M is the maximum value of (probIdx+1). For example, in JCTVC-F254 and VCEG-AZ07, the M is 512. Table 2 shows the lookup table disclosed in JCTVC-F254, which consists of 64 columns for the range values and 512 entries. For each entry, the range value is represented by 9 bits.

TABLE 2 (Range >> 2)&63 Sets 0 1 . . . 63 Range Min 256 260 . . . 508 Range Max 259 263 . . . 511 P_(one) >> 6 P_(One) Range One . . . . . . . . . . . . . . . . . . 10 0.02  5 5 . . . 10 11 0.023 6 6 . . . 11 12 0.024 6 6 . . . 12 13 0.026 7 7 . . . 13 14 0.028 7 7 . . . 14 15 0.03  8 8 . . . 15 . . . . . . . . . . . . . . . . . . 511  0.999 255 259 . . . 507

Two in-loop filters are included in H.265/HEVC video coding standard. They are deblocking filter and sample adaptive offset (SAO). The deblocking filter can reduce the blocky artifacts caused by quantization error. SAO can further improve the video quality by applying offset values to classified samples. Prior to HEVC Test Model 7 (HM-7), another in-loop filtering technique named adaptive loop filter (ALF) was also included. ALF uses Wiener filtering techniques to derive filter coefficients. Multiple filters are coded according to different picture regions. The filter coefficients are coded in adaptation parameter set (APS), and on/off control flags are coded using CTU-level (coding tree unit level) syntax elements.

It is obvious that filter coefficients are the major bitrate overhead when coding ALF syntax elements. Usually, the texture characteristics of neighbouring coding block are very similar to the current coding block. Therefore, the neighbouring coding block filter can be directly used for the current coding block to save bitrate overhead. Since two neighbouring blocks apply the same filter coefficients in this case, this coding method is also called filter merge. A priority-based block filter merge scheme has also been disclosed. The first step is to choose maximum N candidates from M pre-defined neighbouring blocks. The second step is to select one filter among N candidates and code its filter index to bitstream. In the following, a method to further improve the performance of the priority-based block filter merge scheme is disclosed.

When multiple filters are supported in ALF, besides dividing one picture into different regions, some pixel-based or block-based classification methods are also presented before HM-7. For example, an ALF technique to calculate the Sum-modified Laplacian Measure (SLM) of each pixel has been disclosed. Pixels with the same SLM value will be filtered by one filter. As shown in FIG. 3, each square denotes a pixel, and pixels of SLMn are filtered by one filter, where n can be 1, 2, or 3 in this example. Here, the SLM is treated as a kind of pixel classification rule (PCR). For block-based classification method, the first step is similar to the pixel-based classification to calculate the characteristic of each pixel in one block. The second step is to calculate the property of one block based on the characteristics of all pixels in one block.

BRIEF SUMMARY OF THE INVENTION

A method and apparatus of entropy coding of image and video data for an image or video encoder or decoder using multiple-table based Context-Based Adaptive Binary Arithmetic Coder (CABAC) are disclosed. In one embodiment, a current bin of a binary data of a current coding symbol is encoded or decoded according to a probability of a binary value of the current bin and the probability of the binary value is updated according to the binary value of the current bin for a next bin by using multiple-parameter probability models. The probability of the binary value of the current bin is generated from one or more previously coded symbols before the current coding symbol. Each multiple-parameter probability model is updated using an individual set of probability states associated with a corresponding parameter. In particular, each multiple-parameter probability model is updated using at least one lookup table with the individual set of probability state as a table index to access contents of said at least one lookup table.

In one example, the lookup table comprises an LPS (least probably symbol) range table, where the LPS range table includes pre-determined LPS range for a given probability state and a current range. The LPS range table may include the pre-determined LPS range for the given probability state and a quantized current range to reduce table size. The LPS range table may store range values for a reduced number of the individual set of probability states, and the reduced number of the individual set of probability states are selected by uniformly retaining one probability state out of every M probability states and M is a positive integer greater than 1. For example, the M corresponds to 2, 4 or 8. The LPS range table may store range values for a reduced number of the individual set of probability states, and the reduced number of the individual set of probability states are selected by non-uniformly retaining the individual set of probability states.

The lookup table may comprise a next LPS (least probably symbol) state table or a next MPS (most probably symbol) state table, where the next LPS state table or the next MPS state table includes a next LPS probability state for each current LPS probability state or a next MPS probability state for each current MPS probability state. The next LPS state table may store next LPS states for a reduced number of the LPS probability states, or the next MPS state table stores next MPS states for a reduced number of the MPS probability states.

The multiple-parameter probability models may correspond to two-parameter probability models using a first parameter and a second parameter, and the first parameter is derived based on the second parameter. The first parameter can be equal to the second parameter raised to a power of M, and M is an integer greater than 1. An updated probability of the binary value can be derived from new individual probabilities updated according to the multiple-parameter probability models. Derivation of final probability based on the probabilities of two respective probability states associated with two probability parameters is also disclosed.

Another method of entropy coding of image and video data in an image or video encoder or decoder is also disclosed. The current bin of a binary data of a current coding symbol is encoded or decoded according to a probability of a binary value of the current bin, where the probability of the binary value of the current bin is generated from one or more previously coded symbols before the current coding symbol. The probability of the binary value is then updated according to the binary value of the current bin for a next bin; and encoding or decoding the current bin by using range One or range Zero values derived from at least one range lookup table. A range smaller half (rangeSH), the range One or range Zero values are derived for a given range interval based on a middle range value of the given range interval and a given probability of the binary value.

The at least one range lookup table may comprise a range Zero table or a range One table. One range value can be derived for the middle range value of the given range interval and a middle probability value of given range interval of Zero probability range or One probability range. One range value can be derived for the middle range value of the given range interval and a maximum probability value of the given range interval of Zero probability range or One probability range. The at least one range lookup table may only include range values for Zero probability range or One probability range between 0.0 and 0.5. The range value of the Zero probability range or One probability range between 0.5 and 1.0 may be derived by (current range —the range values for One probability range or Zero probability range between 0.0 and 0.5). The at least one range lookup table may include range values for Zero probability range or One probability range between 0.0 and 1.0, where the range values for the Zero probability range or the One probability range between 0.5and 1.0 are mirrored from the range values for the Zero probability range or the One probability range between 0.0 and 0.5.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 illustrates a basic structure of context-based adaptive binary arithmetic coding (CABAC).

FIG. 2 illustrates a concept of the binary arithmetic coding, where initially, the probability range (i.e., range₀) is 1 and the low boundary (i.e., low₀) is 0 as indicated by a probability scale.

FIG. 3 illustrates an example of Sum-modified Laplacian Measure (SLM) of each pixel, where each square denotes a pixel and pixels of SLMn are filtered by one filter, and n can be 1, 2, or 3 in this example.

FIG. 4 illustrates an example of table-based two-parameter context-based adaptive binary arithmetic coding (CABAC), where one parameter provides faster updater rate and the other parameter provides slower update rate.

FIG. 5 illustrates an exemplary flowchart for a multiple table based context-based adaptive binary arithmetic coding (CABAC) according to one embodiment of the present invention.

FIG. 6 illustrates an exemplary flowchart for another multiple table based context-based adaptive binary arithmetic coding (CABAC) according to one embodiment of the present invention.

DETAILED DESCRIPTION OF THE INVENTION

The following description is of the best-contemplated mode of carrying out the invention. This description is made for the purpose of illustrating the general principles of the invention and should not be taken in a limiting sense. The scope of the invention is best determined by reference to the appended claims.

In JCTVC-F254 and VCEG-AZ07, instead of storing the probability state index, the actual probability of each context is stored in a 16-bits or 32-bits buffer. Comparing to 7-bits state index used in HEVC, the implementation cost increases substantially. For deriving the interval of RangeOne or RangeZero, a 9-bits*64-column*512-entries (i.e., 294912 bits) lookup table is used. The size of lookup table is quite large for a parser. Accordingly, in this invention, a multi-table-based CABAC coding is disclosed. By using the formula in eq. (4) or eq. (19), one or multiple α's are derived. Once an α is derived, other α can be derived by using eq. (20):

α₂=1−(1/(2^(N))), and   (19)

α₁=(α₂)^(M).   (20)

For example, the N can be 7 and M can be 16. Accordingly, the α₂ can be 1−(1/128) and α₁ can be (α₂)¹⁶.

Using the derived α and eq. 3 or eq. 21 (the modified eq. 3), the LPS probability is also derived:

p _(i/1) =α·p _(i), where p₀ is 0.5.   (21)

The multiple α's for deriving the probability states mentioned above are also called multiple parameters or multiple model parameters in this disclosure. As shown above, these probability states correspond to a set of pre-defined values associated with LPS or MPS probability. However, other parameters, such as N and M in the above example, may also be used directly or indirectly as probability model parameter. While the form of probability state is described using eq. (21) and the forms of parameters are described in eq. (19) and (20), it is noted that other equivalent parameter forms are also used in this field. For example, (1−α), (1−α₁) and (1−α₂) have been used to replace the α, α₁ and α₂ in eqs. (19) to (21). It is understood that these different forms are equivalent and can be used interchangeably.

Using the new α and new p, the new range LPS tables for α_(l) and α₂, can be derived as shown in Table 3 (for α₁) and Tables 4a to 4h (for α₂) respectively.

TABLE 3 (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 0 144 176 208 240 1 127 155 183 212 2 112 137 162 187 3 99 121 143 165 4 87 107 126 145 5 77 94 111 128 6 68 83 98 113 7 60 73 86 100 8 53 64 76 88 9 47 57 67 78 10 41 50 59 68 11 36 44 52 60 12 32 39 46 53 13 28 34 41 47 14 25 30 36 41 15 22 27 32 37 16 19 24 28 32 17 17 21 25 28 18 15 18 22 25 19 13 16 19 22 20 12 14 17 20 21 10 13 15 17 22 9 11 13 15 23 8 10 12 13 24 7 9 10 12 25 6 8 9 10 26 6 7 8 9 27 5 6 7 8 28 4 5 6 7 29 4 5 5 6 30 3 4 5 6 31 3 4 4 5

TABLE 4a (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 0 144 176 208 240 1 143 175 206 238 2 142 173 205 236 3 141 172 203 234 4 140 171 202 233 5 138 169 200 231 6 137 168 198 229 7 136 167 197 227 8 135 165 195 225 9 134 164 194 224 10 133 163 192 222 11 132 161 191 220 12 131 160 189 218 13 130 159 188 217 14 129 158 186 215 15 128 156 185 213 16 127 155 183 212 17 126 154 182 210 18 125 153 181 208 19 124 152 179 207 20 123 150 178 205 21 122 149 176 204 22 121 148 175 202 23 120 147 174 200 24 119 146 172 199 25 118 145 171 197 26 117 144 170 196 27 117 142 168 194 28 116 141 167 193 29 115 140 166 191 30 114 139 164 190 31 113 138 163 188 32 112 137 162 187 33 111 136 161 185 34 110 135 159 184 35 109 134 158 182 36 109 133 157 181 37 108 132 156 180 38 107 131 154 178 39 106 130 153 177 40 105 129 152 175 41 104 128 151 174 42 104 127 150 173 43 103 126 148 171 44 102 125 147 170 45 101 124 146 169 46 100 123 145 167 47 100 122 144 166 48 99 121 143 165 49 98 120 142 163 50 97 119 141 162 51 97 118 139 161 52 96 117 138 160 53 95 116 137 158 54 94 115 136 157 55 94 114 135 156 56 93 113 134 155 57 92 113 133 153 58 91 112 132 152 59 91 111 131 151 60 90 110 130 150 61 89 109 129 149 62 89 108 128 148 63 88 107 127 146

TABLE 4b (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 64 87 107 126 145 65 86 106 125 144 66 86 105 124 143 67 85 104 123 142 68 84 103 122 141 69 84 102 121 140 70 83 102 120 139 71 83 101 119 138 72 82 100 118 136 73 81 99 117 135 74 81 99 116 134 75 80 98 116 133 76 79 97 115 132 77 79 96 114 131 78 78 95 113 130 79 77 95 112 129 80 77 94 111 128 81 76 93 110 127 82 76 93 109 126 83 75 92 108 125 84 75 91 108 124 85 74 90 107 123 86 73 90 106 122 87 73 89 105 121 88 72 88 104 120 89 72 88 103 119 90 71 87 103 118 91 71 86 102 118 92 70 86 101 117 93 69 85 100 116 94 69 84 100 115 95 68 84 99 114 96 68 83 98 113 97 67 82 97 112 98 67 82 96 111 99 66 81 96 110 100 66 80 95 110 101 65 80 94 109 102 65 79 93 108 103 64 78 93 107 104 64 78 92 106 105 63 77 91 105 106 63 77 91 105 107 62 76 90 104 108 62 75 89 103 109 61 75 88 102 110 61 74 88 101 111 60 74 87 100 112 60 73 86 100 113 59 73 86 99 114 59 72 85 98 115 58 71 84 97 116 58 71 84 97 117 58 70 83 96 118 57 70 82 95 119 57 69 82 94 120 56 69 81 94 121 56 68 81 93 122 55 68 80 92 123 55 67 79 91 124 54 67 79 91 125 54 66 78 90 126 54 66 77 89 127 53 65 77 89

TABLE 4c (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 128 53 64 76 88 129 52 64 76 87 130 52 63 75 87 131 52 63 74 86 132 51 63 74 85 133 51 62 73 85 134 50 62 73 84 135 50 61 72 83 136 50 61 72 83 137 49 60 71 82 138 49 60 70 81 139 48 59 70 81 140 48 59 69 80 141 48 58 69 79 142 47 58 68 79 143 47 57 68 78 144 47 57 67 78 145 46 56 67 77 146 46 56 66 76 147 45 56 66 76 148 45 55 65 75 149 45 55 65 75 150 44 54 64 74 151 44 54 64 73 152 44 53 63 73 153 43 53 63 72 154 43 53 62 72 155 43 52 62 71 156 42 52 61 71 157 42 51 61 70 158 42 51 60 70 159 41 51 60 69 160 41 50 59 68 161 41 50 59 68 162 40 49 58 67 163 40 49 58 67 164 40 49 57 66 165 39 48 57 66 166 39 48 57 65 167 39 47 56 65 168 39 47 56 64 169 38 47 55 64 170 38 46 55 63 171 38 46 54 63 172 37 46 54 62 173 37 45 54 62 174 37 45 53 61 175 36 45 53 61 176 36 44 52 60 177 36 44 52 60 178 36 44 51 59 179 35 43 51 59 180 35 43 51 58 181 35 43 50 58 182 35 42 50 58 183 34 42 50 57 184 34 42 49 57 185 34 41 49 56 186 33 41 48 56 187 33 41 48 55 188 33 40 48 55 189 33 40 47 55 190 32 40 47 54 191 32 39 47 54

TABLE 4d (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 192 32 39 46 53 193 32 39 46 53 194 31 38 45 52 195 31 38 45 52 196 31 38 45 52 197 31 38 44 51 198 30 37 44 51 199 30 37 44 50 200 30 37 43 50 201 30 36 43 50 202 30 36 43 49 203 29 36 42 49 204 29 36 42 48 205 29 35 42 48 206 29 35 41 48 207 28 35 41 47 208 28 34 41 47 209 28 34 40 47 210 28 34 40 46 211 28 34 40 46 212 27 33 39 46 213 27 33 39 45 214 27 33 39 45 215 27 33 39 44 216 26 32 38 44 217 26 32 38 44 218 26 32 38 43 219 26 32 37 43 220 26 31 37 43 221 25 31 37 42 222 25 31 36 42 223 25 31 36 42 224 25 30 36 41 225 25 30 36 41 226 24 30 35 41 227 24 30 35 40 228 24 29 35 40 229 24 29 35 40 230 24 29 34 40 231 24 29 34 39 232 23 29 34 39 233 23 28 33 39 234 23 28 33 38 235 23 28 33 38 236 23 28 33 38 237 22 27 32 37 238 22 27 32 37 239 22 27 32 37 240 22 27 32 37 241 22 27 31 36 242 22 26 31 36 243 21 26 31 36 244 21 26 31 35 245 21 26 30 35 246 21 26 30 35 247 21 25 30 35 248 21 25 30 34 249 20 25 30 34 250 20 25 29 34 251 20 25 29 34 252 20 24 29 33 253 20 24 29 33 254 20 24 28 33 255 19 24 28 32

TABLE 4e (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 256 19 24 28 32 257 19 23 28 32 258 19 23 27 32 259 19 23 27 31 260 19 23 27 31 261 19 23 27 31 262 18 23 27 31 263 18 22 26 31 264 18 22 26 30 265 18 22 26 30 266 18 22 26 30 267 18 22 26 30 268 18 22 25 29 269 17 21 25 29 270 17 21 25 29 271 17 21 25 29 272 17 21 25 28 273 17 21 24 28 274 17 21 24 28 275 17 20 24 28 276 17 20 24 28 277 16 20 24 27 278 16 20 24 27 279 16 20 23 27 280 16 20 23 27 281 16 19 23 26 282 16 19 23 26 283 16 19 23 26 284 16 19 22 26 285 15 19 22 26 286 15 19 22 25 287 15 19 22 25 288 15 18 22 25 289 15 18 22 25 290 15 18 21 25 291 15 18 21 24 292 15 18 21 24 293 14 18 21 24 294 14 18 21 24 295 14 17 21 24 296 14 17 20 24 297 14 17 20 23 298 14 17 20 23 299 14 17 20 23 300 14 17 20 23 301 14 17 20 23 302 13 16 19 22 303 13 16 19 22 304 13 16 19 22 305 13 16 19 22 306 13 16 19 22 307 13 16 19 22 308 13 16 19 21 309 13 16 18 21 310 13 15 18 21 311 13 15 18 21 312 12 15 18 21 313 12 15 18 21 314 12 15 18 20 315 12 15 18 20 316 12 15 17 20 317 12 15 17 20 318 12 15 17 20 319 12 14 17 20

TABLE 4f (Range>>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 320 12 14 17 20 321 12 14 17 19 322 12 14 17 19 323 11 14 17 19 324 11 14 16 19 325 11 14 16 19 326 11 14 16 19 327 11 14 16 18 328 11 13 16 18 329 11 13 16 18 330 11 13 16 18 331 11 13 16 18 332 11 13 15 18 333 11 13 15 18 334 10 13 15 17 335 10 13 15 17 336 10 13 15 17 337 10 13 15 17 338 10 12 15 17 339 10 12 15 17 340 10 12 14 17 341 10 12 14 17 342 10 12 14 16 343 10 12 14 16 344 10 12 14 16 345 10 12 14 16 346 10 12 14 16 347 9 12 14 16 348 9 11 14 16 349 9 11 13 16 350 9 11 13 15 351 9 11 13 15 352 9 11 13 15 353 9 11 13 15 354 9 11 13 15 355 9 11 13 15 356 9 11 13 15 357 9 11 13 15 358 9 11 13 14 359 9 11 12 14 360 9 10 12 14 361 8 10 12 14 362 8 10 12 14 363 8 10 12 14 364 8 10 12 14 365 8 10 12 14 366 8 10 12 14 367 8 10 12 13 368 8 10 12 13 369 8 10 12 13 370 8 10 11 13 371 8 10 11 13 372 8 10 11 13 373 8 9 11 13 374 8 9 11 13 375 8 9 11 13 376 8 9 11 13 377 7 9 11 12 378 7 9 11 12 379 7 9 11 12 380 7 9 11 12 381 7 9 10 12 382 7 9 10 12 383 7 9 10 12

TABLE 4g (Range >>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 384 7 9 10 12 385 7 9 10 12 386 7 9 10 12 387 7 8 10 12 388 7 8 10 11 389 7 8 10 11 390 7 8 10 11 391 7 8 10 11 392 7 8 10 11 393 7 8 10 11 394 7 8 9 11 395 6 8 9 11 396 6 8 9 11 397 6 8 9 11 398 6 8 9 11 399 6 8 9 10 400 6 8 9 10 401 6 8 9 10 402 6 8 9 10 403 6 7 9 10 404 6 7 9 10 405 6 7 9 10 406 6 7 9 10 407 6 7 9 10 408 6 7 8 10 409 6 7 8 10 410 6 7 8 10 411 6 7 8 10 412 6 7 8 9 413 6 7 8 9 414 6 7 8 9 415 6 7 8 9 416 6 7 8 9 417 5 7 8 9 418 5 7 8 9 419 5 7 8 9 420 5 7 8 9 421 5 6 8 9 422 5 6 8 9 423 5 6 8 9 424 5 6 7 9 425 5 6 7 9 426 5 6 7 8 427 5 6 7 8 428 5 6 7 8 429 5 6 7 8 430 5 6 7 8 431 5 6 7 8 432 5 6 7 8 433 5 6 7 8 434 5 6 7 8 435 5 6 7 8 436 5 6 7 8 437 5 6 7 8 438 5 6 7 8 439 5 6 7 8 440 5 6 7 8 441 5 6 7 8 442 4 5 6 7 443 4 5 6 7 444 4 5 6 7 445 4 5 6 7 446 4 5 6 7 447 4 5 6 7

TABLE 4h (Range >>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 448 4 5 6 7 449 4 5 6 7 450 4 5 6 7 451 4 5 6 7 452 4 5 6 7 453 4 5 6 7 454 4 5 6 7 455 4 5 6 7 456 4 5 6 7 457 4 5 6 7 458 4 5 6 7 459 4 5 6 7 460 4 5 6 7 461 4 5 6 6 462 4 5 6 6 463 4 5 6 6 464 4 5 5 6 465 4 5 5 6 466 4 5 5 6 467 4 5 5 6 468 4 4 5 6 469 4 4 5 6 470 4 4 5 6 471 4 4 5 6 472 4 4 5 6 473 4 4 5 6 474 3 4 5 6 475 3 4 5 6 476 3 4 5 6 477 3 4 5 6 478 3 4 5 6 479 3 4 5 6 480 3 4 5 6 481 3 4 5 6 482 3 4 5 5 483 3 4 5 5 484 3 4 5 5 485 3 4 5 5 486 3 4 5 5 487 3 4 5 5 488 3 4 5 5 489 3 4 4 5 490 3 4 4 5 491 3 4 4 5 492 3 4 4 5 493 3 4 4 5 494 3 4 4 5 495 3 4 4 5 496 3 4 4 5 497 3 4 4 5 498 3 4 4 5 499 3 4 4 5 500 3 3 4 5 501 3 3 4 5 502 3 3 4 5 503 3 3 4 5 504 3 3 4 5 505 3 3 4 5 506 3 3 4 5 507 3 3 4 5 508 3 3 4 4 509 3 3 4 4 510 3 3 4 4 511 3 3 4 4

FIG. 4 illustrates an example of table-based two-parameter context-based adaptive binary arithmetic coding (CABAC), where one parameter (i.e., N₁ corresponding to α₁) provides faster updater rate and the other parameter (i.e., N₂ corresponding to α₂) provides slower update rate.

For each context, it has multiple probability states associated with multiple parameters. For example, it may have two probability states associated with two parameters for each context: one for α₁ and another for α₂. The states (e.g. state a and state b) in each context are updated independently. For example, for encoding/decoding a bin, one state can be updated to the LPS state and the other can be updated to the MPS state. When deriving the range LPS for coding (RLPSC), the range LPS of each state can be derived by table lookup. If the MPS of two states are the same, the RLPSC is the average of the range LPS of state a (RLPS_a) and the range LPS of state b (RLPS_b). Otherwise, the average range of bin-0 and average range of bin-1 are derived. The RLPSC is the average range with smaller value. For example, if RLPS_a is smaller, the RLPSC is equal to the average RLPS_a and range_MPS_b. If RLPS_b is smaller, the RLPSC is equal to the average RLPS_b and range MPS_a. range_MPS_x is equal to (range−RLPS_x), where x corresponds to a or b. The average operation between value A and value B can be implemented using the right-shift operation, such as ((A+B)>>1) or ((A+B+1)>>1). The RLPSC, RMPSC (range MPS for coding), and MPS can be derived according to the process in the following table:

TABLE 5 if (MPS_a == MPS_b) {  MPS = MPS_a;  RLPSC = (RLPS_a + RLPS_b )>> 1; } else {  if(RLPS_a < RLPS_b)  {   MPS = MPS_a;   RLPSC = (RLPS_a + (range − RLPS_b ))>> 1;  }  else  {   MPS = MPS_b;   RLPSC = (RLPS_b + (range − RLPS_a ))>> 1;  } } RMPSC = range − RLPSC

The derived range LPS for coding and range MPS for coding, which is equal to (range−RLPSC), can be used for HEVC CABAC. The table-based multi-parameter CABAC as shown above can reduce the lookup table (LUT) size substantially.

In the multi-table based CABAC, the MPS values or the LPS values associated with the probability states for a given context may be different. As mentioned above, the two probability states for two-table case may have different MPS or LPS values. Therefore, instead of dealing with the probability model associated with MPS and LPS, it is also possible to deal with bin values 0 and 1. Accordingly, another method is to use the LPS table to derive the RangeOne or the RangeZero for each probability state, where RangeOne is the range value for the bin value being 1 and RangeZero is the range value for the bin value being 0. The averaged RangeOne or RangeZero can be derived by averaging the RangeOnes or the RangeZeros respectively. The RangeOne for coding (ROFC) and RangeZero for coding (RZFC) can be derived by the process as shown in the Tables 6 to 9:

TABLE 6 RangeZero_a = ((MPS_a == 1) ? RLPS_a : (range − RLPS_a )); RangeZero_b = ((MPS_b == 1) ? RLPS_b : (range − RLPS_b )); RZFC = (RangeZero_a + RangeZero_b )>> 1; ROFC = range − RZFC; or ROFC = (2*range − RangeZero_a − RangeZero_b +1)>>1;

TABLE 7 RangeZero_a = ((MPS_a == 1) ? RLPS_a : (range − RLPS_a )); RangeZero_b = ((MPS_b == 1) ? RLPS_b : (range − RLPS_b )); RZFC = (RangeZero_a + RangeZero_b + 1 )>> 1; ROFC = range − RZFC; or ROFC = (2*range − RangeZero_a − RangeZero_b)>>1;

TABLE 8 RangeOne_a = ((MPS_a == 0) ? RLPS_a : (range − RLPS_a )); RangeOne_b = ((MPS_b == 0) ? RLPS_b : (range − RLPS_b )); ROFC = (RangeOne_a + RangeOne_b )>> 1; RZFC = range − ROFC; or RZFC = (2*range −RangeOne_a −RangeOne_b +1)>>1;

TABLE 9 RangeOne_a = ((MPS_a == 0) ? RLPS_a : (range − RLPS_a )); RangeOne_b = ((MPS_b == 0) ? RLPS_b : (range − RLPS_b )); ROFC = (RangeOne_a + RangeOne_b +1)>> 1; RZFC = range − ROFC; or RZFC = (2*range −RangeOne_a −RangeOne_b)>>1;

The derived ROFC and RZFC can be used for CABAC. The table-based multi-parameter CABAC as disclosed above can reduce the LUT size substantially.

To further reduce the LUT size, the LUT can be down-sampled. For example, the LUT for α_(l) can be down-sampled. The down-sampled LUT can be LPS transition table and/or range LPS table. Two kinds of down-sampling method are shown below.

Uniform Quantization:

-   -   M:1 compression by storing 0, M, 2M, 3M, . . . states, where         M=2, 4, 8.     -   For LPS transition, next_LPS_state(K)=next_LPS_state (K/M)+K % M         or next_LPS_state(K)=next_LPS_state (K/M)+K % M except for K=0,         or K=0, 1.

Non-Uniform Quantization:

-   -   No compression for states in [0,N/4-1],     -   2:1 compression for states in [N/4, N/2-1],     -   4:1 compression for states in [N/2, N-1], and     -   N can be 512

For example, Table 10 illustrates an example of the range LPS LUT for α₁ with the compression ratio M=8. For a state K, its rangeLPS is LUT(K/M).

TABLE 10 (Range >>6)&3 Sets 0 1 2 3 Range Min 256 320 384 448 Range Max 319 383 447 511 State Range LPS 0 144 176 208 240 8 135 165 195 225 16 127 155 183 212 24 119 146 172 199 32 112 137 162 187 40 105 129 152 175 48 99 121 143 165 56 93 113 134 155 64 87 107 126 145 72 82 100 118 136 80 77 94 111 128 88 72 88 104 120 96 68 83 98 113 104 64 78 92 106 112 60 73 86 100 120 56 69 81 94 128 53 64 76 88 136 50 61 72 83 144 47 57 67 78 152 44 53 63 73 160 41 50 59 68 168 39 47 56 64 176 36 44 52 60 184 34 42 49 57 192 32 39 46 53 200 30 37 43 50 208 28 34 41 47 216 26 32 38 44 224 25 30 36 41 232 23 29 34 39 240 22 27 32 37 248 21 25 30 34 256 19 24 28 32 264 18 22 26 30 272 17 21 25 28 280 16 20 23 27 288 15 18 22 25 296 14 17 20 24 304 13 16 19 22 312 12 15 18 21 320 12 14 17 20 328 11 13 16 18 336 10 13 15 17 344 10 12 14 16 352 9 11 13 15 360 9 10 12 14 368 8 10 12 13 376 8 9 11 13 384 7 9 10 12 392 7 8 10 11 400 6 8 9 10 408 6 7 8 10 416 6 7 8 9 424 5 6 7 9 432 5 6 7 8 440 5 6 7 8 448 4 5 6 7 456 4 5 6 7 464 4 5 5 6 472 4 4 5 6 480 3 4 5 6 488 3 4 5 5 496 3 4 4 5 504 3 3 4 5

Since α_(l) and α₂ are related by α_(l)=(α₂)¹⁶, the table of α₂ can be reused for α_(l). The state S1 in α₁ is equal to the state S1*16 in α₂. For example, the state 1 in α₁ is equal to the state 16 in α₂, and the state 2 in α_(l) is equal to the state 32 in α₂.

Table 11 illustrates an example of the next LPS state for α₁, where “−1” in the table means changing to MPS and the state is set to 0 and “−2” means changing to MPS and the state is set to 1.

TABLE 11 State in α₁ next_LPS_State for α₁ 0 −1 or −2 1 0 2 1 3 1 4 2 5 3 6 3 7 4 8 5 9 5 10 6 11 6 12 7 13 7 14 8 15 8 16 8 17 9 18 9 19 9 20 9 21 10 22 10 23 10 24 10 25 10 26 10 27 11 28 11 29 11 30 11 31 11

Table 12 illustrates an example of the next LPS state for α₂ with the compression ratio M equal to 8. For a state K, its next LPS state is equal to (next__state (K/M)+K % M). For state 0, its next LPS state can be −1 or −2, where “−1” means changing to MPS and the state is set to 0, and “−2” means changing to MPS and the state is set to 1.

TABLE 12 State in α₁ next_LPS_State for α₁ 0 −1 or −2 1 0 2 1 3 1 4 2 5 3 6 3 7 4 8 5 9 5 10 6 11 6 12 7 13 7 14 8 15 8 16 8 17 9 18 9 19 9 20 9 21 10 22 10 23 10 24 10 25 10 26 10 27 11 28 11 29 11 30 11 31 11

For state initialization, the initial state derivation used by HEVC can be re-used. However, a lookup table to map the initial state (probability) in HEVC to the nearest initial state (probability) is used according to the table-based multi-parameter CABAC of the present invention. Table 13 illustrates an example of the initial state mapping table for α₁ and α₂.

TABLE 13 State in HEVC State for α₁ State for α₁ 0 0 0 1 0 7 2 1 13 3 1 20 4 2 27 5 2 33 6 3 40 7 3 47 8 3 53 9 4 60 10 4 66 11 5 73 12 5 80 13 5 86 14 6 93 15 6 100 16 7 106 17 7 113 18 7 120 19 8 126 20 8 133 21 9 140 22 9 146 23 10 153 24 10 159 25 10 166 26 11 173 27 11 179 28 12 186 29 12 193 30 12 199 31 13 206 32 13 213 33 14 219 34 14 226 35 15 233 36 15 239 37 15 246 38 16 253 39 16 259 40 17 266 41 17 272 42 17 279 43 18 286 44 18 292 45 19 299 46 19 306 47 20 312 48 20 319 49 20 326 50 21 332 51 21 339 52 22 346 53 22 352 54 22 359 55 23 365 56 23 372 57 24 379 58 24 385 59 25 392 60 25 399 61 25 405 62 26 412 63 26 419

In this invention, we also propose to use more than one parameter (e.g. more than one α) for CABAC coding. For each α, it has its states, rangeLPS table (or rangeOne table, or rangeZero table), next MPS table, and next LPS table. For each context, it can choose to use single α or two α's. If two α's are used, the methods mentioned above can be used. Some syntaxes can use single α, and some syntaxes can use two α's. This side information (e.g. information to indicate syntax using one α or two α's and to identify which α) can be predefined or signalled in the bitstream. For example, the coefficient related the syntaxes can use single α, and others syntaxes can use two α's. In another example, the coefficient-related syntaxes can use two α's, and others syntaxes can use single α. These α can be derived by using eqs. 4, 19, and 20. For example, α₅ can be 1−(1/128); α₁ can be (α₅)¹⁶; α₂ can be (α₅)⁸; α₃ can be (α₅)⁴; and α₄ can be (α₅)². The rangeLPS tables can be shared. Only the rangeLPS table for smallest α (e.g. α₅) needs to be stored. The rangeLPS tables for other α are a subset of the rangeLPS tables of the smallest α. The state number for each α is also predefined. Each context stores information regarding which α is used and the current state.

In CABAC, the valid range value is from 256 to 510. For the rangeLPS derivation, the number of columns required depends on the resolution of range. For example, in Table 3 and Tables 4a-4h, the range is divided into four parts: 256 to 319, 320 to 383, 384 to 447, and 448 to 510. The middle value (mid_value) of each range part can be derived accordingly, such as 288, 352, 416, and 480 respectively. For the first state (first entry) in each column, the probability is (0.5*mid_value). The second state in each column is the first state multiplied by α. The following states in each column are the previous state multiplied by α. For rangeLPS derivation, the mid_value can be changed to a value equal to or larger than the smallest range value (e.g. 256, 320, 384, and 448) and equal to or smaller than the largest range value (e.g. 319, 383, 447, and 510).

In JCTVC-F254 and VCEG-AZ07, the rangeOne table covers the probability from 0.0 to 1.0. However, it makes the LUT too large for implemented in terms of hardware cost. The LUT is 144 times of the LUT of HEVC. Moreover, because the entry value of the RangeOne or RangeZero is derived from the MinRange (eq. 18), the coding efficiency will dropped dramatically if the down-sampled LUT is used.

Therefore, a method is disclosed in the present invention to store the probability range from 0.0 to 0.5 only, which is called range smaller half (rangeSH). The values in the other half of the table can be derived by using (range−rangeSH). The number of rows defines the resolution of the probabilities. For example, a rangeSHtable with 64 rows can be designed for probability range from 0.5 to 0.0. Each row represents the rangeLPS for a probability range of 1/64. The value of rangeSH is derived by ((range A)*(Prob B)). Table 14 illustrates an exemplary rangeSH table with 4 columns and 64 rows. The first row represents the rangeSH for probability from 63/128 to 64/128 in four different range sections. In Table 14, the range A corresponds to range Mid and Prob B corresponds to Prob Max. The value of rangeSH is derived by ((range Mid)*(Prob Max)).

TABLE 14 (Range >>6)&3 rangeIdx 0 1 2 3 range Min 256 320 384 448 range Max 319 383 447 511 range Mid Prob Max Prob Min probIdx 288 352 416 480 64/128 63/128 63 144 176 208 240 63/128 62/128 62 142 173 205 236 62/128 61/128 61 140 171 202 233 61/128 60/128 60 137 168 198 229 60/128 59/128 59 135 165 195 225 59/128 58/128 58 133 162 192 221 58/128 57/128 57 131 160 189 218 57/128 56/128 56 128 157 185 214 56/128 55/128 55 126 154 182 210 55/128 54/128 54 124 151 179 206 54/128 53/128 53 122 149 176 203 53/128 52/128 52 119 146 172 199 52/128 51/128 51 117 143 169 195 51/128 50/128 50 115 140 166 191 50/128 49/128 49 113 138 163 188 49/128 48/128 48 110 135 159 184 48/128 47/128 47 108 132 156 180 47/128 46/128 46 106 129 153 176 46/128 45/128 45 104 127 150 173 45/128 44/128 44 101 124 146 169 44/128 43/128 43 99 121 143 165 43/128 42/128 42 97 118 140 161 42/128 41/128 41 95 116 137 158 41/128 40/128 40 92 113 133 154 40/128 39/128 39 90 110 130 150 39/128 38/128 38 88 107 127 146 38/128 37/128 37 86 105 124 143 37/128 36/128 36 83 102 120 139 36/128 35/128 35 81 99 117 135 35/128 34/128 34 79 96 114 131 34/128 33/128 33 77 94 111 128 33/128 32/128 32 74 91 107 124 32/128 31/128 31 72 88 104 120 31/128 30/128 30 70 85 101 116 30/128 29/128 29 68 83 98 113 29/128 28/128 28 65 80 94 109 28/128 27/128 27 63 77 91 105 27/128 26/128 26 61 74 88 101 26/128 25/128 25 59 72 85 98 25/128 24/128 24 56 69 81 94 24/128 23/128 23 54 66 78 90 23/128 22/128 22 52 63 75 86 22/128 21/128 21 50 61 72 83 21/128 20/128 20 47 58 68 79 20/128 19/128 19 45 55 65 75 19/128 18/128 18 43 52 62 71 18/128 17/128 17 41 50 59 68 17/128 16/128 16 38 47 55 64 16/128 15/128 15 36 44 52 60 15/128 14/128 14 34 41 49 56 14/128 13/128 13 32 39 46 53 13/128 12/128 12 29 36 42 49 12/128 11/128 11 27 33 39 45 11/128 10/128 10 25 30 36 41 10/128 09/128 9 23 28 33 38 09/128 08/128 8 20 25 29 34 08/128 07/128 7 18 22 26 30 07/128 06/128 6 16 19 23 26 06/128 05/128 5 14 17 20 23 05/128 04/128 4 11 14 16 19 04/128 03/128 3 9 11 13 15 03/128 02/128 2 7 8 10 11 02/128 01/128 1 5 6 7 8 01/128 00/128 0 2 3 3 4

Table 15 illustrates another exemplary derivation method for rangeSH, which is derived by ((range Mid)*((Prob Max+Prob Min)/2)).

TABLE 15 (Range >>6)&3 rangeIdx 0 1 2 3 range Min 256 320 384 448 range Max 319 383 447 511 range Mid Prob Max Prob Min probIdx 288 352 416 480 64/128 63/128 63 143 175 206 238 63/128 62/128 62 141 172 203 234 62/128 61/128 61 138 169 200 231 61/128 60/128 60 136 166 197 227 60/128 59/128 59 134 164 193 223 59/128 58/128 58 132 161 190 219 58/128 57/128 57 129 158 187 216 57/128 56/128 56 127 155 184 212 56/128 55/128 55 125 153 180 208 55/128 54/128 54 123 150 177 204 54/128 53/128 53 120 147 174 201 53/128 52/128 52 118 144 171 197 52/128 51/128 51 116 142 167 193 51/128 50/128 50 114 139 164 189 50/128 49/128 49 111 136 161 186 49/128 48/128 48 109 133 158 182 48/128 47/128 47 107 131 154 178 47/128 46/128 46 105 128 151 174 46/128 45/128 45 102 125 148 171 45/128 44/128 44 100 122 145 167 44/128 43/128 43 98 120 141 163 43/128 42/128 42 96 117 138 159 42/128 41/128 41 93 114 135 156 41/128 40/128 40 91 111 132 152 40/128 39/128 39 89 109 128 148 39/128 38/128 38 87 106 125 144 38/128 37/128 37 84 103 122 141 37/128 36/128 36 82 100 119 137 36/128 35/128 35 80 98 115 133 35/128 34/128 34 78 95 112 129 34/128 33/128 33 75 92 109 126 33/128 32/128 32 73 89 106 122 32/128 31/128 31 71 87 102 118 31/128 30/128 30 69 84 99 114 30/128 29/128 29 66 81 96 111 29/128 28/128 28 64 78 93 107 28/128 27/128 27 62 76 89 103 27/128 26/128 26 60 73 86 99 26/128 25/128 25 57 70 83 96 25/128 24/128 24 55 67 80 92 24/128 23/128 23 53 65 76 88 23/128 22/128 22 51 62 73 84 22/128 21/128 21 48 59 70 81 21/128 20/128 20 46 56 67 77 20/128 19/128 19 44 54 63 73 19/128 18/128 18 42 51 60 69 18/128 17/128 17 39 48 57 66 17/128 16/128 16 37 45 54 62 16/128 15/128 15 35 43 50 58 15/128 14/128 14 33 40 47 54 14/128 13/128 13 30 37 44 51 13/128 12/128 12 28 34 41 47 12/128 11/128 11 26 32 37 43 11/128 10/128 10 24 29 34 39 10/128 09/128 9 21 26 31 36 09/128 08/128 8 19 23 28 32 08/128 07/128 7 17 21 24 28 07/128 06/128 6 15 18 21 24 06/128 05/128 5 12 15 18 21 05/128 04/128 4 10 12 15 17 04/128 03/128 3 8 10 11 13 03/128 02/128 2 6 7 8 9 02/128 01/128 1 3 4 5 6 01/128 00/128 0 1 1 2 2

Table 16 illustrates yet another exemplary value derivation method, where rangeSH is derived by ((range Mid)*((Prob Max+Prob Min)/2)) and the minimum value is clipped to 3. In JCTVC-F254 and VCEG-AZ07, if the probability of one is larger than 0.5, (e.g. 0.64), it means that the probability of zero is 0.36. The 0.36 (in 18-th row) will be used to find the range for rangeZero. The rangeOne can be derived by (range−rangeZero).

TABLE 16 (Range >>6)&3 rangeIdx 0 1 2 3 range Min 256 320 384 448 range Max 319 383 447 511 range Mid Prob Max Prob Min probIdx 288 352 416 480 64/128 63/128 63 143 175 206 238 63/128 62/128 62 141 172 203 234 62/128 61/128 61 138 169 200 231 61/128 60/128 60 136 166 197 227 60/128 59/128 59 134 164 193 223 59/128 58/128 58 132 161 190 219 58/128 57/128 57 129 158 187 216 57/128 56/128 56 127 155 184 212 56/128 55/128 55 125 153 180 208 55/128 54/128 54 123 150 177 204 54/128 53/128 53 120 147 174 201 53/128 52/128 52 118 144 171 197 52/128 51/128 51 116 142 167 193 51/128 50/128 50 114 139 164 189 50/128 49/128 49 111 136 161 186 49/128 48/128 48 109 133 158 182 48/128 47/128 47 107 131 154 178 47/128 46/128 46 105 128 151 174 46/128 45/128 45 102 125 148 171 45/128 44/128 44 100 122 145 167 44/128 43/128 43 98 120 141 163 43/128 42/128 42 96 117 138 159 42/128 41/128 41 93 114 135 156 41/128 40/128 40 91 111 132 152 40/128 39/128 39 89 109 128 148 39/128 38/128 38 87 106 125 144 38/128 37/128 37 84 103 122 141 37/128 36/128 36 82 100 119 137 36/128 35/128 35 80 98 115 133 35/128 34/128 34 78 95 112 129 34/128 33/128 33 75 92 109 126 33/128 32/128 32 73 89 106 122 32/128 31/128 31 71 87 102 118 31/128 30/128 30 69 84 99 114 30/128 29/128 29 66 81 96 111 29/128 28/128 28 64 78 93 107 28/128 27/128 27 62 76 89 103 27/128 26/128 26 60 73 86 99 26/128 25/128 25 57 70 83 96 25/128 24/128 24 55 67 80 92 24/128 23/128 23 53 65 76 88 23/128 22/128 22 51 62 73 84 22/128 21/128 21 48 59 70 81 21/128 20/128 20 46 56 67 77 20/128 19/128 19 44 54 63 73 19/128 18/128 18 42 51 60 69 18/128 17/128 17 39 48 57 66 17/128 16/128 16 37 45 54 62 16/128 15/128 15 35 43 50 58 15/128 14/128 14 33 40 47 54 14/128 13/128 13 30 37 44 51 13/128 12/128 12 28 34 41 47 12/128 11/128 11 26 32 37 43 11/128 10/128 10 24 29 34 39 10/128 09/128 9 21 26 31 36 09/128 08/128 8 19 23 28 32 08/128 07/128 7 17 21 24 28 07/128 06/128 6 15 18 21 24 06/128 05/128 5 12 15 18 21 05/128 04/128 4 10 12 15 17 04/128 03/128 3 8 10 11 13 03/128 02/128 2 6 7 8 9 02/128 01/128 1 3 4 5 6 01/128 00/128 0 3 3 3 3

In one embodiment for deriving the RangeOne (or RangeZero), the probLPS can be derived using the expression: probLPS=(P>=2^(k−1))?(P−2^(k−1)): (2^(k−1)−1−P) for a k-bit probability (2^(k)>P>0). The expression “x?y:z” represents a logic operation, where if x is TRUE or not equal to 0, evaluates to the value of y; otherwise, evaluates to the value of z. The probIdx can be derived as (probLPS>>(k−n−1)), where the rangeSH table has 2^(n) rows. The rangeIdx is derived as (range>>(8−m))−(256>>m), ((range−256)>>(8−m)), or ((range>>(8−m))&(2^(m)−1)), where the rangeSH table has 2^(m) columns. The rangeSH is determined from rangeSHTable[probIdx][rangeIdx]. If P is equal to or larger than 2^(k−1) (or the k-th bit of P being 1), the rangeOne is equal to (range−rangeSH) and rangeZero is equal to rangeSH. Otherwise (i.e., P smaller than 2^(k−1)), the rangeOne is equal to rangeSH and rangeZero is equal to (range−rangeSH).

In the example of JCTVC-F254 and VCEG-AZ07, k is 15, the probLPS is determined from the expression: probLPS=((P>=16384)?P−16384: 16383−P), probIdx is equal to (probLPS>>8), rangeIdx is equal to (range>>6) & 3. If P is equal to or larger than 16384, the rangeOne is equal to (range−rangeSH) and rangeZero is equal to rangeSH. Otherwise (i.e., P smaller than 16384), the rangeOne is equal to rangeSH and rangeZero is equal to (range−rangeSH).

Note that, since the (2^(k−1)−1) is all ones in binary representation, so the (2^(k−1)−1−P) is just to perform the bitwise inverse for k−1 bits of LSB (least significant bit). In hardware implementation, the bitwise exclusive or (XOR) for the k-th bit of P and the 0-th to (k−1)-th bits of P to derive the probLPS.

In another embodiment, the rangeSH table is duplicated to reduce the computation complexity. Table 17 illustrates an example of the mirrored table of Table 16. The entries are mirrored in the boundary between the probIdx 63 and 64. By using this kind of rangeSH table, the probIdx can be derived by probIdx=(P>>(k−n)) directly, where the rangeSH table has 2^(n) rows. In the example of JCTVC-F254 and VCEG-AZ07, k is 15, the probIdx is equal to (P>>8), rangeIdx is equal to ((range>>6)&3). If P is equal to or larger than 16384 (or the 15-th bit of P equal to 1), the rangeOne is equal to (range−rangeSH) and rangeZero is equal to rangeSH. Otherwise (i.e., P smaller than 16384), the rangeOne is equal to rangeSH and rangeZero is equal to (range−rangeSH).

TABLE 17 (Range >>6)&3 rangeIdx 0 1 2 3 range Min 256 320 384 448 range Max 319 383 447 511 range Mid Prob Max Prob Min probIdx 288 352 416 480 01/128 00/128 127 3 3 2 2 02/128 01/128 126 3 4 5 6 03/128 02/128 125 6 7 8 9 04/128 03/128 124 8 10 11 13 05/128 04/128 123 10 12 15 17 06/128 05/128 122 12 15 18 21 07/128 06/128 121 15 18 21 24 08/128 07/128 120 17 21 24 28 09/128 08/128 119 19 23 28 32 10/128 09/128 118 21 26 31 36 11/128 10/128 117 24 29 34 39 12/128 11/128 116 26 32 37 43 13/128 12/128 115 28 34 41 47 14/128 13/128 114 30 37 44 51 15/128 14/128 113 33 40 47 54 16/128 15/128 112 35 43 50 58 17/128 16/128 111 37 45 54 62 18/128 17/128 110 39 48 57 66 19/128 18/128 109 42 51 60 69 20/128 19/128 108 44 54 63 73 21/128 20/128 107 46 56 67 77 22/128 21/128 106 48 59 70 81 23/128 22/128 105 51 62 73 84 24/128 23/128 104 53 65 76 88 25/128 24/128 103 55 67 80 92 26/128 25/128 102 57 70 83 96 27/128 26/128 101 60 73 86 99 28/128 27/128 100 62 76 89 103 29/128 28/128 99 64 78 93 107 30/128 29/128 98 66 81 96 111 31/128 30/128 97 69 84 99 114 32/128 31/128 96 71 87 102 118 33/128 32/128 95 73 89 106 122 34/128 33/128 94 75 92 109 126 35/128 34/128 93 78 95 112 129 36/128 35/128 92 80 98 115 133 37/128 36/128 91 82 100 119 137 38/128 37/128 90 84 103 122 141 39/128 38/128 89 87 106 125 144 40/128 39/128 88 89 109 128 148 41/128 40/128 87 91 111 132 152 42/128 41/128 86 93 114 135 156 43/128 42/128 85 96 117 138 159 44/128 43/128 84 98 120 141 163 45/128 44/128 83 100 122 145 167 46/128 45/128 82 102 125 148 171 47/128 46/128 81 105 128 151 174 48/128 47/128 80 107 131 154 178 49/128 48/128 79 109 133 158 182 50/128 49/128 78 111 136 161 186 51/128 50/128 77 114 139 164 189 52/128 51/128 76 116 142 167 193 53/128 52/128 75 118 144 171 197 54/128 53/128 74 120 147 174 201 55/128 54/128 73 123 150 177 204 56/128 55/128 72 125 153 180 208 57/128 56/128 71 127 155 184 212 58/128 57/128 70 129 158 187 216 59/128 58/128 69 132 161 190 219 60/128 59/128 68 134 164 193 223 61/128 60/128 67 136 166 197 227 62/128 61/128 66 138 169 200 231 63/128 62/128 65 141 172 203 234 64/128 63/128 64 143 175 206 238 64/128 63/128 63 143 175 206 238 63/128 62/128 62 141 172 203 234 62/128 61/128 61 138 169 200 231 61/128 60/128 60 136 166 197 227 60/128 59/128 59 134 164 193 223 59/128 58/128 58 132 161 190 219 58/128 57/128 57 129 158 187 216 57/128 56/128 56 127 155 184 212 56/128 55/128 55 125 153 180 208 55/128 54/128 54 123 150 177 204 54/128 53/128 53 120 147 174 201 53/128 52/128 52 118 144 171 197 52/128 51/128 51 116 142 167 193 51/128 50/128 50 114 139 164 189 50/128 49/128 49 111 136 161 186 49/128 48/128 48 109 133 158 182 48/128 47/128 47 107 131 154 178 47/128 46/128 46 105 128 151 174 46/128 45/128 45 102 125 148 171 45/128 44/128 44 100 122 145 167 44/128 43/128 43 98 120 141 163 43/128 42/128 42 96 117 138 159 42/128 41/128 41 93 114 135 156 41/128 40/128 40 91 111 132 152 40/128 39/128 39 89 109 128 148 39/128 38/128 38 87 106 125 144 38/128 37/128 37 84 103 122 141 37/128 36/128 36 82 100 119 137 36/128 35/128 35 80 98 115 133 35/128 34/128 34 78 95 112 129 34/128 33/128 33 75 92 109 126 33/128 32/128 32 73 89 106 122 32/128 31/128 31 71 87 102 118 31/128 30/128 30 69 84 99 114 30/128 29/128 29 66 81 96 111 29/128 28/128 28 64 78 93 107 28/128 27/128 27 62 76 89 103 27/128 26/128 26 60 73 86 99 26/128 25/128 25 57 70 83 96 25/128 24/128 24 55 67 80 92 24/128 23/128 23 53 65 76 88 23/128 22/128 22 51 62 73 84 22/128 21/128 21 48 59 70 81 21/128 20/128 20 46 56 67 77 20/128 19/128 19 44 54 63 73 19/128 18/128 18 42 51 60 69 18/128 17/128 17 39 48 57 66 17/128 16/128 16 37 45 54 62 16/128 15/128 15 35 43 50 58 15/128 14/128 14 33 40 47 54 14/128 13/128 13 30 37 44 51 13/128 12/128 12 28 34 41 47 12/128 11/128 11 26 32 37 43 11/128 10/128 10 24 29 34 39 10/128 09/128 9 21 26 31 36 09/128 08/128 8 19 23 28 32 08/128 07/128 7 17 21 24 28 07/128 06/128 6 15 18 21 24 06/128 05/128 5 12 15 18 21 05/128 04/128 4 10 12 15 17 04/128 03/128 3 8 10 11 13 03/128 02/128 2 6 7 8 9 02/128 01/128 1 3 4 5 6 01/128 00/128 0 3 3 3 3

In another example, the 8-cloumns mirrored rangeSH table is used as shown in Table 18. For JCTVC-F254 and VCEG-AZ07, the parameter settings correspond to k=15, n=7, and m=3. The related probability parameters are derived as probIdx=(P>>8), rangeIdx=((range>>5) &7). If P is equal to or larger than 16384 (i.e., the 15-th bit of P being 1), the related probability parameters are derived as rangeOne=(range−rangeSH) and rangeZero=rangeSH. Otherwise (i.e., P smaller than 16384), the related probability parameters are derived as rangeOne=rangeSH and rangeZero=(range−rangeSH).

TABLE 18 (Range >>5)&7 rangeIdx 0 1 2 3 4 5 6 7 range Min 256 288 320 352 384 416 448 480 range Max 287 319 351 383 415 447 479 511 range Mid Prob Max Prob Min probIdx 272 304 336 368 400 432 464 496 01/128 00/128 127 3 3 3 3 3 3 3 3 02/128 01/128 126 3 4 4 4 5 5 5 6 03/128 02/128 125 5 6 7 7 8 8 9 10 04/128 03/128 124 7 8 9 10 11 12 13 14 05/128 04/128 123 10 11 12 13 14 15 16 17 06/128 05/128 122 12 13 14 16 17 19 20 21 07/128 06/128 121 14 15 17 19 20 22 24 25 08/128 07/128 120 16 18 20 22 23 25 27 29 09/128 08/128 119 18 20 22 24 27 29 31 33 10/128 09/128 118 20 23 25 27 30 32 34 37 11/128 10/128 117 22 25 28 30 33 35 38 41 12/128 11/128 116 24 27 30 33 36 39 42 45 13/128 12/128 115 27 30 33 36 39 42 45 48 14/128 13/128 114 29 32 35 39 42 46 49 52 15/128 14/128 113 31 34 38 42 45 49 53 56 16/128 15/128 112 33 37 41 45 48 52 56 60 17/128 16/128 111 35 39 43 47 52 56 60 64 18/128 17/128 110 37 42 46 50 55 59 63 68 19/128 18/128 109 39 44 49 53 58 62 67 72 20/128 19/128 108 41 46 51 56 61 66 71 76 21/128 20/128 107 44 49 54 59 64 69 74 79 22/128 21/128 106 46 51 56 62 67 73 78 83 23/128 22/128 105 48 53 59 65 70 76 82 87 24/128 23/128 104 50 56 62 68 73 79 85 91 25/128 24/128 103 52 58 64 70 77 83 89 95 26/128 25/128 102 54 61 67 73 80 86 92 99 27/128 26/128 101 56 63 70 76 83 89 96 103 28/128 27/128 100 58 65 72 79 86 93 100 107 29/128 28/128 99 61 68 75 82 89 96 103 110 30/128 29/128 98 63 70 77 85 92 100 107 114 31/128 30/128 97 65 72 80 88 95 103 111 118 32/128 31/128 96 67 75 83 91 98 106 114 122 33/128 32/128 95 69 77 85 93 102 110 118 126 34/128 33/128 94 71 80 88 96 105 113 121 130 35/128 34/128 93 73 82 91 99 108 116 125 134 36/128 35/128 92 75 84 93 102 111 120 129 138 37/128 36/128 91 78 87 96 105 114 123 132 141 38/128 37/128 90 80 89 98 108 117 127 136 145 39/128 38/128 89 82 91 101 111 120 130 140 149 40/128 39/128 88 84 94 104 114 123 133 143 153 41/128 40/128 87 86 96 106 116 127 137 147 157 42/128 41/128 86 88 99 109 119 130 140 150 161 43/128 42/128 85 90 101 112 122 133 143 154 165 44/128 43/128 84 92 103 114 125 136 147 158 169 45/128 44/128 83 95 106 117 128 139 150 161 172 46/128 45/128 82 97 108 119 131 142 154 165 176 47/128 46/128 81 99 110 122 134 145 157 169 180 48/128 47/128 80 101 113 125 137 148 160 172 184 49/128 48/128 79 103 115 127 139 152 164 176 188 50/128 49/128 78 105 118 130 142 155 167 179 192 51/128 50/128 77 107 120 133 145 158 170 183 196 52/128 51/128 76 109 122 135 148 161 174 187 200 53/128 52/128 75 112 125 138 151 164 177 190 203 54/128 53/128 74 114 127 140 154 167 181 194 207 55/128 54/128 73 116 129 143 157 170 184 198 211 56/128 55/128 72 118 132 146 160 173 187 201 215 57/128 56/128 71 120 134 148 162 177 191 205 219 58/128 57/128 70 122 137 151 165 180 194 208 223 59/128 58/128 69 124 139 154 168 183 197 212 227 60/128 59/128 68 126 141 156 171 186 201 216 231 61/128 60/128 67 129 144 159 174 189 204 219 234 62/128 61/128 66 131 146 161 177 192 208 223 238 63/128 62/128 65 133 148 164 180 195 211 227 242 64/128 63/128 64 135 151 167 183 198 214 230 246 64/128 63/128 63 135 151 167 183 198 214 230 246 63/128 62/128 62 133 148 164 180 195 211 227 242 62/128 61/128 61 131 146 161 177 192 208 223 238 61/128 60/128 60 129 144 159 174 189 204 219 234 60/128 59/128 59 126 141 156 171 186 201 216 231 59/128 58/128 58 124 139 154 168 183 197 212 227 58/128 57/128 57 122 137 151 165 180 194 208 223 57/128 56/128 56 120 134 148 162 177 191 205 219 56/128 55/128 55 118 132 146 160 173 187 201 215 55/128 54/128 54 116 129 143 157 170 184 198 211 54/128 53/128 53 114 127 140 154 167 181 194 207 53/128 52/128 52 112 125 138 151 164 177 190 203 52/128 51/128 51 109 122 135 148 161 174 187 200 51/128 50/128 50 107 120 133 145 158 170 183 196 50/128 49/128 49 105 118 130 142 155 167 179 192 49/128 48/128 48 103 115 127 139 152 164 176 188 48/128 47/128 47 101 113 125 137 148 160 172 184 47/128 46/128 46 99 110 122 134 145 157 169 180 46/128 45/128 45 97 108 119 131 142 154 165 176 45/128 44/128 44 95 106 117 128 139 150 161 172 44/128 43/128 43 92 103 114 125 136 147 158 169 43/128 42/128 42 90 101 112 122 133 143 154 165 42/128 41/128 41 88 99 109 119 130 140 150 161 41/128 40/128 40 86 96 106 116 127 137 147 157 40/128 39/128 39 84 94 104 114 123 133 143 153 39/128 38/128 38 82 91 101 111 120 130 140 149 38/128 37/128 37 80 89 98 108 117 127 136 145 37/128 36/128 36 78 87 96 105 114 123 132 141 36/128 35/128 35 75 84 93 102 111 120 129 138 35/128 34/128 34 73 82 91 99 108 116 125 134 34/128 33/128 33 71 80 88 96 105 113 121 130 33/128 32/128 32 69 77 85 93 102 110 118 126 32/128 31/128 31 67 75 83 91 98 106 114 122 31/128 30/128 30 65 72 80 88 95 103 111 118 30/128 29/128 29 63 70 77 85 92 100 107 114 29/128 28/128 28 61 68 75 82 89 96 103 110 28/128 27/128 27 58 65 72 79 86 93 100 107 27/128 26/128 26 56 63 70 76 83 89 96 103 26/128 25/128 25 54 61 67 73 80 86 92 99 25/128 24/128 24 52 58 64 70 77 83 89 95 24/128 23/128 23 50 56 62 68 73 79 85 91 23/128 22/128 22 48 53 59 65 70 76 82 87 22/128 21/128 21 46 51 56 62 67 73 78 83 21/128 20/128 20 44 49 54 59 64 69 74 79 20/128 19/128 19 41 46 51 56 61 66 71 76 19/128 18/128 18 39 44 49 53 58 62 67 72 18/128 17/128 17 37 42 46 50 55 59 63 68 17/128 16/128 16 35 39 43 47 52 56 60 64 16/128 15/128 15 33 37 41 45 48 52 56 60 15/128 14/128 14 31 34 38 42 45 49 53 56 14/128 13/128 13 29 32 35 39 42 46 49 52 13/128 12/128 12 27 30 33 36 39 42 45 48 12/128 11/128 11 24 27 30 33 36 39 42 45 11/128 10/128 10 22 25 28 30 33 35 38 41 10/128 09/128 9 20 23 25 27 30 32 34 37 09/128 08/128 8 18 20 22 24 27 29 31 33 08/128 07/128 7 16 18 20 22 23 25 27 29 07/128 06/128 6 14 15 17 19 20 22 24 25 06/128 05/128 5 12 13 14 16 17 19 20 21 05/128 04/128 4 10 11 12 13 14 15 16 17 04/128 03/128 3 7 8 9 10 11 12 13 14 03/128 02/128 2 5 6 7 7 8 8 9 10 02/128 01/128 1 3 4 4 4 5 5 5 6 01/128 00/128 0 3 3 3 3 3 3 3 3

In another example, the 8 columns by 64 rows mirrored rangeSH table is used as shown in Table 19. For JCTVC-F254 and VCEG-AZ07, the parameter settings correspond to k =15, n=6, and m=3. The related probability parameters are derived as probIdx=(P>>9), rangeIdx=((range>>5) &7). If P is equal to or larger than 16384 (i.e., the 15-th bit of P being 1), the related probability parameters are derived as rangeOne=(range−rangeSH) and rangeZero=rangeSH. Otherwise (i.e., P smaller than 16384), rangeOne=rangeSH and rangeZero=(range−rangeSH). The table size of Table 19 is the same as the rangeSH table of HEVC or H.264/AVC.

TABLE 19 (Range >>5)&7 rangeIdx 0 1 2 3 4 5 6 7 range Min 256 288 320 352 384 416 448 480 range Max 287 319 351 383 415 447 479 511 range Mid Prob Max Prob Min probIdx 272 304 336 368 400 432 464 496 01/64 01/64 63 3 3 3 3 3 3 4 4 02/64 02/64 62 6 7 8 9 9 10 11 12 03/64 03/64 61 11 12 13 14 16 17 18 19 04/64 04/64 60 15 17 18 20 22 24 25 27 05/64 05/64 59 19 21 24 26 28 30 33 35 06/64 06/64 58 23 26 29 32 34 37 40 43 07/64 07/64 57 28 31 34 37 41 44 47 50 08/64 08/64 56 32 36 39 43 47 51 54 58 09/64 09/64 55 36 40 45 49 53 57 62 66 10/64 10/64 54 40 45 50 55 59 64 69 74 11/64 11/64 53 45 50 55 60 66 71 76 81 12/64 12/64 52 49 55 60 66 72 78 83 89 13/64 13/64 51 53 59 66 72 78 84 91 97 14/64 14/64 50 57 64 71 78 84 91 98 105 15/64 15/64 49 62 69 76 83 91 98 105 112 16/64 16/64 48 66 74 81 89 97 105 112 120 17/64 17/64 47 70 78 87 95 103 111 120 128 18/64 18/64 46 74 83 92 101 109 118 127 136 19/64 19/64 45 79 88 97 106 116 125 134 143 20/64 20/64 44 83 93 102 112 122 132 141 151 21/64 21/64 43 87 97 108 118 128 138 149 159 22/64 22/64 42 91 102 113 124 134 145 156 167 23/64 23/64 41 96 107 118 129 141 152 163 174 24/64 24/64 40 100 112 123 135 147 159 170 182 25/64 25/64 39 104 116 129 141 153 165 178 190 26/64 26/64 38 108 121 134 147 159 172 185 198 27/64 27/64 37 113 126 139 152 166 179 192 205 28/64 28/64 36 117 131 144 158 172 186 199 213 29/64 29/64 35 121 135 150 164 178 192 207 221 30/64 30/64 34 125 140 155 170 184 199 214 229 31/64 31/64 33 130 145 160 175 191 206 221 236 32/64 32/64 32 134 150 165 181 197 213 228 244 32/64 32/64 31 134 150 165 181 197 213 228 244 31/64 31/64 30 130 145 160 175 191 206 221 236 30/64 30/64 29 125 140 155 170 184 199 214 229 29/64 29/64 28 121 135 150 164 178 192 207 221 28/64 28/64 27 117 131 144 158 172 186 199 213 27/64 27/64 26 113 126 139 152 166 179 192 205 26/64 26/64 25 108 121 134 147 159 172 185 198 25/64 25/64 24 104 116 129 141 153 165 178 190 24/64 24/64 23 100 112 123 135 147 159 170 182 23/64 23/64 22 96 107 118 129 141 152 163 174 22/64 22/64 21 91 102 113 124 134 145 156 167 21/64 21/64 20 87 97 108 118 128 138 149 159 20/64 20/64 19 83 93 102 112 122 132 141 151 19/64 19/64 18 79 88 97 106 116 125 134 143 18/64 18/64 17 74 83 92 101 109 118 127 136 17/64 17/64 16 70 78 87 95 103 111 120 128 16/64 16/64 15 66 74 81 89 97 105 112 120 15/64 15/64 14 62 69 76 83 91 98 105 112 14/64 14/64 13 57 64 71 78 84 91 98 105 13/64 13/64 12 53 59 66 72 78 84 91 97 12/64 12/64 11 49 55 60 66 72 78 83 89 11/64 11/64 10 45 50 55 60 66 71 76 81 10/64 10/64 9 40 45 50 55 59 64 69 74 09/64 09/64 8 36 40 45 49 53 57 62 66 08/64 08/64 7 32 36 39 43 47 51 54 58 07/64 07/64 6 28 31 34 37 41 44 47 50 06/64 06/64 5 23 26 29 32 34 37 40 43 05/64 05/64 4 19 21 24 26 28 30 33 35 04/64 04/64 3 15 17 18 20 22 24 25 27 03/64 03/64 2 11 12 13 14 16 17 18 19 02/64 02/64 1 6 7 8 9 9 10 11 12 01/64 01/64 0 3 3 3 3 3 3 4 4

In Tables 17 through 19, the entry value of rangeSH will not necessary be clipped to be larger than 3.

Table 20 illustrates comparison of range lookup table size of an embodiment of the present invention and the JCTVC-F254 with the HEVC standard. The approach based on JCTVC-F254 requires 12126% of the HEVC register size while the embodiment of the present invention requires 870% of the HEVC register size. In other words, the method disclosed in JCTVC-F254 requires a lookup table nearly 14 times as large as the embodiment of the present invention.

TABLE 20 Lookup Table LPS trans. range Size table table Mem. size comparison HEVC 64*6 8*4*64 2432 100% Table-two-α 512*9 + 32*5 8*4*512 21152 870% JCTVC-F254 9*64*512 294912 12126% 

In another embodiment, if the probability of one is larger than 0.5 (e.g 0.64), the probability larger than 0.5 will be used for table lookup. For example, if the range is 500, the fourth column is used. The probability value of 0.14 corresponds to the value in the 47th row, which is 68. rangeOne can be ((range Mid/2) +68)=308, or can be ((range/2) +68)=318. If rangeOne is larger than the range, rangeOne can be clipped to (range−K), where the K is an integer and K can be different for different range values or different sections.

In the priority-based block filter merge scheme, the first step is to choose maximum N candidates from M pre-defined neighbouring blocks. However, the number of available filter candidates among M pre-defined neighbouring blocks may be smaller than N due to unavailability at picture boundaries, repetitive filters, or filter off. When this case occurs, some coding performance loss may occur. In order to overcome this issue, the following embodiments are disclosed, where one or more filters are added to the candidate list of the priority-based block filter merge scheme. In the first embodiment, additional filters are generated by using available filters. For example, some coefficients far from the center position can be removed to form a new filter. In another example, a new symmetric filter can be generated by averaging the coefficients of one available filter. In yet another example, one or more predefined filters or an average filters from available filters can be added to fill the candidate list of the priority-based block filter merge scheme.

In the embodiments disclosed above, the similarity among to-be-filtered pixel and neighbouring pixels can be used for pixel classification. The neighbouring pixels are defined by using one window, such as a cross pattern, 3×3 square, or 5×5 diamond. The center position of one window is the to-be-filtered pixels. For each neighbouring pixel in this window, if the difference of pixel value between neighbouring pixel and to-be-filtered pixel is smaller than a threshold, the similarity is increased by one. Otherwise, the similarity is not increased. After comparing all neighbouring pixels to-be-filtered pixel, we can get one similarity value for one to-be-filtered pixel. Based on the similarity values, pixels can be classified into different groups, and different filters are applied for different groups in the ALF (adaptive loop filter) process. During the development of the HEVC standard, the original pixel classification was applied to all pixels in one picture according to HM-7 or before HM-7.0. However, other adaptive schemes, such as CTB-based (coding-tree-block based) ALF scheme was also disclosed during the development of the HEVC standard, where ALF parameters are coded and can be changed from CTB to CTB. It is also possible to apply pixel classification to only some CTBs in one picture.

FIG. 5 illustrates an exemplary flowchart for a multiple table based context-based adaptive binary arithmetic coding (CABAC) according to one embodiment of the present invention. The method encode or decode a current bin of a binary data of a current coding symbol according to a probability of a binary value of the current bin as shown in step 510, where the probability of the binary value of current bin is generated from one or more previously coded symbols before the current coding symbol. The probability of the binary value is updated according to the binary value of the current bin for a next bin by using multiple-parameter probability models in step 520, where each of the multiple-parameter probability models is updated using an individual set of probability states associated with a corresponding parameter.

FIG. 6 illustrates an exemplary flowchart for another multiple table based context-based adaptive binary arithmetic coding (CABAC) according to one embodiment of the present invention. The method encode or decode a current bin of a binary data of a current coding symbol according to a probability of a binary value of the current bin as shown in step 610, where the probability of the binary value of the current bin is generated from one or more previously coded symbols before the current coding symbol. The probability of the binary value is updated according to the binary value of the current bin for a next bin in step 620, where range One or range Zero values derived from at least one range lookup table is used for encoding or decoding the current bin, and wherein a range smaller half (rangeSH), the range One or range Zero values are derived for a given range interval based on a middle range value of the given range interval and a given probability of the binary value.

The flowcharts shown are intended to illustrate an example of video coding according to the present invention. A person skilled in the art may modify each step, re-arranges the steps, split a step, or combine steps to practice the present invention without departing from the spirit of the present invention. In the disclosure, specific syntax and semantics have been used to illustrate examples to implement embodiments of the present invention. A skilled person may practice the present invention by substituting the syntax and semantics with equivalent syntax and semantics without departing from the spirit of the present invention.

The above description is presented to enable a person of ordinary skill in the art to practice the present invention as provided in the context of a particular application and its requirement. Various modifications to the described embodiments will be apparent to those with skill in the art, and the general principles defined herein may be applied to other embodiments. Therefore, the present invention is not intended to be limited to the particular embodiments shown and described, but is to be accorded the widest scope consistent with the principles and novel features herein disclosed. In the above detailed description, various specific details are illustrated in order to provide a thorough understanding of the present invention. Nevertheless, it will be understood by those skilled in the art that the present invention may be practiced.

Embodiment of the present invention as described above may be implemented in various hardware, software codes, or a combination of both. For example, an embodiment of the present invention can be one or more circuit circuits integrated into a video compression chip or program code integrated into video compression software to perform the processing described herein. An embodiment of the present invention may also be program code to be executed on a Digital Signal Processor (DSP) to perform the processing described herein. The invention may also involve a number of functions to be performed by a computer processor, a digital signal processor, a microprocessor, or field programmable gate array (FPGA). These processors can be configured to perform particular tasks according to the invention, by executing machine-readable software code or firmware code that defines the particular methods embodied by the invention. The software code or firmware code may be developed in different programming languages and different formats or styles. The software code may also be compiled for different target platforms. However, different code formats, styles and languages of software codes and other means of configuring code to perform the tasks in accordance with the invention will not depart from the spirit and scope of the invention.

The invention may be embodied in other specific forms without departing from its spirit or essential characteristics. The described examples are to be considered in all respects only as illustrative and not restrictive. The scope of the invention is therefore, indicated by the appended claims rather than by the foregoing description. All changes which come within the meaning and range of equivalency of the claims are to be embraced within their scope. 

1. A method of entropy coding of image or video data for an image or video encoder or decoder, the method comprising: encoding or decoding a current bin of a binary data of a current coding symbol according to a probability of a binary value of the current bin, wherein the probability of the binary value of the current bin is generated from one or more previously coded symbols before the current coding symbol; and updating the probability of the binary value according to the binary value of the current bin for a next bin by using multiple-parameter probability models, wherein each of the multiple-parameter probability models is updated using an individual set of probability states associated with a corresponding parameter.
 2. The method of claim 1, wherein each of the multiple-parameter probability models is updated using at least one lookup table with the individual set of probability states as a table index to access contents of said at least one lookup table.
 3. The method of claim 2, wherein said at least one lookup table comprises an LPS (least probably symbol) range table, wherein the LPS range table includes a pre-determined LPS range for a given probability state and a current range.
 4. The method of claim 3, wherein the LPS range table includes the pre-determined LPS range for the given probability state and a quantized current range to reduce table size.
 5. The method of claim 3, wherein the LPS range table stores LPS range values for a reduced number of the individual set of probability states, and the reduced number of the individual set of probability states are selected by uniformly retaining one probability state out of every M probability states and M is a positive integer greater than
 1. 6. (canceled)
 7. The method of claim 3, wherein the LPS range table stores LPS range values for a reduced number of the individual set of probability states, and the reduced number of the individual set of probability states are selected by non-uniformly retaining the individual set of probability states.
 8. The method of claim 2, wherein said at least one lookup table comprises a next LPS (least probably symbol) state table or a next MPS (most probably symbol) state table, wherein the next LPS state table or the next MPS state table includes a next LPS probability state for each current LPS probability state or a next MPS probability state for each current MPS probability state.
 9. (canceled)
 10. The method of claim 2, wherein the multiple-parameter probability models correspond to two-parameter probability models using a first parameter and a second parameter, and wherein the first parameter is derived based on the second parameter.
 11. The method of claim 10, wherein the first parameter is equal to the second parameter raised to a power of N, and N is an integer greater than
 1. 12. The method of claim 2, wherein the multiple-parameter probability models correspond to two-parameter probability models using two parameters, and a single alpha value or two alpha values are used to derive at least one of the two parameters for each context.
 13. The method of claim 12, wherein side information regarding whether the single alpha value or the two alpha values are used is pre-defined or signalled in a video bitstream. 14-22. (canceled)
 23. A method of entropy coding of image or video data in an image or video encoder or decoder, the method comprising: encoding or decoding a current bin of a binary data of a current coding symbol according to a probability of a binary value of the current bin, wherein the probability of the binary value of the current bin is generated from one or more previously coded symbols before the current coding symbol; and updating the probability of the binary value according to the binary value of the current bin for a next bin, wherein range One or range Zero values derived from at least one range lookup table are used for encoding or decoding the current bin; and wherein a range smaller half (rangeSH), the range One or range Zero values are derived for a given range interval based on the given range interval and a given probability of the binary value.
 24. The method of claim 23, wherein said at least one range lookup table comprises arrange Zero table or a range One table.
 25. The method of claim 24, wherein one range value is derived for a middle range value of the given range interval and a middle probability value of the given range interval of a Zero probability range or One probability range.
 26. The method of claim 25, wherein one range value is derived for a middle range value of the given range interval and a maximum probability value of the given range interval of a Zero probability range or One probability range.
 27. The method of claim 24, wherein said at least one range lookup table only includes range values for a Zero probability range or One probability range between 0.0 and 0.5.
 28. The method of claim 27, wherein the range value of the Zero probability range or One probability range between 0.5 and 1.0 are derived by (current range−the range values for One probability range or Zero probability range between 0.0 and 0.5).
 29. The method of claim 24, wherein said at least one range lookup table includes range values for Zero probability range or One probability range between 0.0 and 1.0, and wherein the range values for the Zero probability range or the One probability range between 0.5and 1.0 are mirrored from the range values for the Zero probability range or the One probability range between 0.0 and 0.5.
 30. An entropy coding apparatus for an image or video encoder or decoder, the entropy coding apparatus comprising: a binary arithmetic coder for encoding or decoding a current bin of a binary data of a current coding symbol according to a probability of a binary value for the current bin, wherein the probability of the binary value of the current bin generated from one or more previously coded symbols before the current coding symbol; and a context model unit for updating the probability of the binary value according to the binary value of the current bin for a next bin, wherein range One or range Zero values derived from at least one range lookup table are used for encoding or decoding the current bin; and wherein the range One or range Zero values are derived for a given range interval based on a middle range value of the given range interval. 